On the Classification of 3--Bridge Links

Using a new way to represent links, that we call a butterfly representation, we assign to each 3-bridge link diagram a sequence of six integers, collected as a triple (p/n,q/m,s/l), such that p≥ q≥ s≥2, 0<n≤ p, 0<m≤ q and 0<l≤ s. For each 3-bridge link there exists an infinite number of 3-bridge diagrams, so we define an order in the set (p/n,q/m,s/l) and assign to each 3-bridge link L the minimum among all the triples that correspond to a 3-butterfly of L, and call it the butterfly presentation of L. This presentation extends, in a natural way, the well known Schubert classification of 2-bridge links. We obtain necessary and sufficient conditions for a triple (p/n,q/m,s/l) to correspond to a 3-butterfly and so, to a 3-bridge link diagram. Given a triple (p/n,q/m,s/l) we give an algorithm to draw a canonical 3-bridge diagram of the associated link. We present formulas for a 3-butterfly of the mirror image of a link, for the connected sum of two rational knots and for some important families of 3-bridge links. We present the open question: When do the triples (p/n,q/m,s/l) and (p'/n',q'/m',s'/l') represent the same 3-bridge link?

Bibliographic Details

Main Authors:	HILDEN,HUGH MICHAEL, MONTESINOS,JOSÉ MARÍA, TEJADA,DÉBORA MARÍA, TORO,MARGARITA MARÍA
Format:	Digital revista
Language:	English
Published:	Universidad Nacional de Colombia y Sociedad Colombiana de Matemáticas 2012
Online Access:	http://www.scielo.org.co/scielo.php?script=sci_arttext&pid=S0034-74262012000200002
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